Sobolev-Lorentz spaces in the Euclidean setting and counterexamples

Abstract

This paper studies the inclusions between different Sobolev-Lorentz spaces W1,(p,q)() defined on open sets ⊂ Rn, where n 1 is an integer, 1<p<∞ and 1 q ∞. We prove that if 1 q<r ∞, then W1,(p,q)() is strictly included in W1,(p,r)(). We show that although H1,(p,∞)() ⊂neq W1,(p,∞)() where ⊂ Rn is open and n 1, there exists a partial converse. Namely, we show that if a function u in W1,(p,∞)(), n 1 is such that u and its distributional gradient ∇ u have absolutely continuous (p,∞)-norm, then u belongs to H1,(p,∞)() as well. We also extend the Morrey embedding theorem to the Sobolev-Lorentz spaces H01,(p,q)() with 1 n<p<∞ and 1 q ∞. Namely, we prove that the Sobolev-Lorentz spaces H01,(p,q)() embed into the space of H\"older continuous functions on with exponent 1-np whenever ⊂ Rn is open, 1 n<p<∞, and 1 q ∞.